Ir al contenido

Documat

Analysis and Applications of Sequential Hybrid ψ -Hilfer Fractional Differential Equations and Inclusions in Banach Algebra

  • Autores: A. Boutiara, J. Alzabut, A.G.M. Selvam, D. Vignesh
  • Localización: Qualitative theory of dynamical systems, ISSN 1575-5460, Vol. 22, Nº 1, 2023
  • Idioma: inglés
  • Enlaces
  • Resumen

    • This research inscription gets to grips with a specific kind of sequential hybrid fractional differential equation en-capsuling a collective fractional derivative known as the ψ-Hilfer type fractional operator. The existence of the solutions of the forehanded equations is tackled by using Dhage fixed point theorem on Banach algebras while their uniqueness is handled capitalizing on the Banach fixed point theorem. On the top of this, the stability within the scope of Ulam-Hyers of solutions to these systems are considered. Finally, pertinent examples with applications are presented to corroborate the reported results.

  • Referencias bibliográficas
    • 1. Kilbas, A.A., Srivastava, H.M., Trujillo, J.J.: Theory and Applications of Fractional Differential Equations, North-Holland Mathematics...
    • 2. Boutiara, A.: Multi-term fractional q-difference equations with q-integral boundary conditions via topological degree theory, Commun. Optim....
    • 3. Boutiara, A., Benbachir, M., Guerbati, K.: Measure of noncompactness for nonlinear hilfer fractional differential equation in banach spaces....
    • 4. Boutiara, A., Benbachir, M., Guerbati, K.: Caputo type fractional differential equation with nonlocal erdélyi-kober type integral boundary...
    • 5. Boutiara, A., Etemad, S., Alzabut, J., Hussain, A., Subramanian, M., Rezapour, S.: On a nonlinear sequential four-point fractional q-difference...
    • 6. Boutiara, A., Etemad, S., Hussain, A., Rezapour, S.: The generalized U-H and U-H stability and existence analysis of a coupled hybrid system...
    • 7. Boutiara, A., Matar, M.M., Kaabar, M.K., Martinez, F., Etemad, S., Rezapour, S.: Some qualitative analyses of neutral functional delay...
    • 8. Boutiara, A.: Mixed fractional differential equation with nonlocal conditions in Banach spaces. J. Math. Model. 9(3), 451–463 (2021)
    • 9. Selvam, A.G.M., Alzabut, J., Vignesh, D., Jonnalagadda, J.M., Abodayeh, K.: Existence and stability of nonolinear discrete fractional initial...
    • 10. Lasota, A., Opial, Z.: An application of the Kakutani-Ky Fan theorem in the theory of ordinary differential equations. Bull. Acad. Pol....
    • 11. Dhage, B.C., Ntouyas, S.K.: Existence results for boundary value problems for fractional hybrid differential inclusions. Topol. Methods...
    • 12. Dhage, B.C.: Existence results for neutral functional differential inclusions in Banach algebras. Nonlinear Anal. 64, 1290–1306 (2006)
    • 13. Dhage, B.C.: A fixed point theorem in Banach algebras involving three operators with applications. Kyungpook Math. J. 44, 145–155 (2004)
    • 14. Dhage, B.C.: A nonlinear alternative in Banach algebras with applications to functional differential equations, Nonlinear. Funct. Anal....
    • 15. Dhage, B.C.: Basic results in the theory of hybrid differential equations with mixed perturbation of second type. Funct. Diff. Equ. 19,...
    • 16. Thaiprayoon, C., Sudsutad, W., Alzabut, J., Etamed, S., Rezapour, S.: On the qualitative analysis of the fractional boundary value problem...
    • 17. Srivastava, H., Tomovski, Z.: Fractional calculus with an integral operator containing a generalized Mittag–Leffler function in the kernel....
    • 18. Podlubny, I.: Fractional Differential Equations. Academic Press, New York (1999)
    • 19. Alzabut, J., Selvam, A.G.M., El-Nabulsi, R.A., Vignesh, D., Samei, M.E.: Asymptotic stability of nonlinear discrete fractional pantograph...
    • 20. Alzabut, J., Selvam, A.G.M., Vignesh, D.: Yousef gholami, solvability and stability of nonlinear hybrid − difference equations of fractional...
    • 21. Aubin, J., Cellna, A.: Differential inclusions: set-valued maps and viability theory. Springer, Verlag (1984)
    • 22. Sousa, J.V.D.C., de Oliveira, E.C.: On the ψ-Hilfer fractional derivative. Commun. Nonlinear Sci. Numer. Simul. 60, 72–91 (2018)
    • 23. Sousa, J.V.D.C., de Oliveira, E.C.: On the stability of a hyperbolic fractional partial differential equations. Differ. Equ. Dyn. Syst....
    • 24. Deimling, K.: Multi-valued differential equations. Walter de Gruyter, Berlin (1992)
    • 25. Abdo, M.S., Panchal, S.K., Saeed, A.M.: Fractional boundary value problem with ψ-Caputo fractional derivative. Proc. Indian Acad. Sci....
    • 26. Ahmad, M., Zada, A., Alzabut, J.: Hyers-Ulam stability of a coupled system of fractional differential equations of Hilfer - Hadamard type....
    • 27. Herzallah, M.A.E., Baleanu, D.: On fractional order hybrid differential equations. Abst. Appl. Analy. 2014, 389386 (2014)
    • 28. Almeida, R.: A Caputo fractional derivative of a function with respect to another function. Commun. Nonlinear Sci. Numer. Simul. 44, 460–481...
    • 29. Almeida, R., Malinowska, A.B., Teresa, N., Monteiro, T.: Fractional differential equations with a Caputo derivative with respect to a...
    • 30. Almeida, R.: Fractional differential equations with mixed boundary conditions. Bull. Malays. Math. Sci. Soc. 42, 1687–1697 (2019)
    • 31. Almeida, R.: Functional differential equations involving the ψ-Caputo fractional derivative. Fractal Fract. 4(2), 29 (2020)
    • 32. Enns, R.H., Mcguire, G.C.: Nonlinear physics with mathematica for scientists and engineers. Birkhauser Bost. 3, 7643–7659 (2001)
    • 33. Hilfer, R.: Applications of Fractional Calculus in Physics. World Scientific, Singapore (2000)
    • 34. Agarwal, R.P., Meehan, M., O’Regan, D.: Fixed Point Theory and Applications. Cambridge University Press, Cambridge (2001)
    • 35. Chasreechai, S., Sitthiwirattham, T.: Existence results of initial value problems for hybrid fractional sum-difference equations. Discrete...
    • 36. Samko, S.G., Kilbas, A.A.: Marichev: fractional integrals and derivatives. Theory Appl. Gordon Breach 1, 109 (1993)
    • 37. Sitho, S., Ntouyas, S.K., Tariboon, J.: Existence results for hybrid fractional integro-differential equations. Bound. Value Probl. 2015(1),...
    • 38. Bashiri, T., Vaezpour, S.M., Park, C.: Existence results for fractional hybrid differential systems in Banach algebras. Adv. Diff. Equat....
    • 39. Shatanawi, W., Boutiara, A., Abdo, M.S., Jeelani, M.B., Abodayeh, K.: Nonlocal and multiple-point fractional boundary value problem in...
    • 40. Singla, K., Gupta, R.K.: On invariant analysis of some time fractional nonlinear systems of partial differential equations. I J. Math.l...
    • 41. Grahovac, N.M., Zigic, M.M.: Modelling of the hamstring muscle group by use of fractional derivatives. Comput. Math. Appl. 59, 1695–1700...
    • 42. Sousa, J. Vanterler da C., Vellappandi, M., Govindaraj, V., Frederico, Gastão S. F.: Reachability of fractional dynamical systems using...
    • 43. El-Nabulsi, R.A.: Glaeske-Kilbas-Saigo fractional integration and fractional Dixmier trace. Acta Math. Vietnam. 37(2), 149–160 (2012)
    • 44. Balachandran, K., Govindaraj, V., Rivero,M., Trujillo, J.J.: Controllability of fractional damped dynamical systems. Appl. Math. Computat....
    • 45. El-Nabulsi, R.A.: Nonlocal-in-time kinetic energy in nonconservative fractional systems, disordered dynamics, jerk and snap and oscillatory...
    • 46. Borisut, P., Kumam, P., Ahmed, I., Jirakitpuwapat,W.: Existence and uniqueness for ψ-Hilfer fractional differential equation with nonlocal...
    • 47. El-Nabulsi, R.A.: On a new fractional uncertainty relation and its implications in quantum mechanics and molecular physics. Proceed. Royal...
    • 48. Moshrefi-Torbati, M., Hammond, J.K.: Physical and geometrical interpretation of fractional operators. J. Franklin Instit. 335B(6), 1077–1086...
    • 49. El-Nabulsi, R.A.: Path integral formulation of fractionally perturbed Lagrangian oscillators on fractal. J. Statist. Phys. 172(6), 1617–1640...
    • 50. Balachandran, K., Govindaraj, V., Rodríguez-Germa, L., Trujillo, J.J.: Controllability results for nonlinear fractional-order dynamical...
    • 51. Balachandran, K., Govindaraj, V., Rodríguez-Germa, L., Trujillo, J.J.: Controllability of nonlinear higher order fractional dynamical...
    • 52. El-Nabulsi, R.A.: Non-standard fractional Lagrangians. Nonlinear Dyn. 74(1), 381–394 (2013)
    • 53. El-Nabulsi, R.A.: Finite two-point space without quantization on noncommutative space from a generalized fractional integral operator....
    • 54. Babakhani, A., Yadollahzadeh, M., Neamaty, A.: Some properties of pseudo-fractional operators. J Pseudo-Diff. Operat Appl. 9(3), 677–700...
    • 55. El-Nabulsi, R.A.: Fractional oscillators from non-standard Lagrangians and time-dependent fractional exponent. Computat. Appl. Math. 33(1),...
    • 56. Caponetto, R., Dongola, G., Fortuna, L., Petras, I.: Fractional Order Systems: Modeling and Control Applications. World Scientific, Singapore...
    • 57. Tabouche, N., Berhail, A., Matar, M.M., Alzabut, J., Selvam, A.G.M., Vignesh, D.: Existence and stability analysis of solution for Mathieu...
    • 58. Shammakh, W., Selvam, A. George Maria., Vignesh, D., Alzabut, J.: A study of generalized hybrid discrete pantograph equation via Hilfer...
    • 59. Alzabut, J., Selvam, A. George., Maria, Vignesh, Mohammadi, H., Rezapour, S.: On chaos of discrete time fractional order host-immune-tumor...
    • 60. Selvam, A.G.M., Baleanu, D., Alzabut, J., Vignesh, D., Abbas, S.: On Hyers-Ulam Mittag-Leffler stability of discrete fractional Duffing...
    • 61. Jajarmi, Amin, Baleanu, Dumitru, Sadat Sajjadi, Samaneh, Nieto, Juan J.: Analysis and some applications of a regularized ψ–Hilfer fractional...
Fundación Dialnet

Mi Documat

Opciones de artículo

Opciones de compartir

Opciones de entorno